In this thesis, we first present an interpretation of parareal as a two-level domain decomposition preconditioner so-called the two-level additive Schwarz in time preconditioner and, based on that, a variant that accelerates convergence by using a GMRES-type procedure. Connections to the MGRIT generalization of parareal are shown. The interpretation allows us to derive convergence results for multiple variations of the method where we vary the number and order of coarse and fine level iterations. We also present the idea of using a different model so-called the reduced model which is based on the two-scale asymptotic expansion for the coarse propagator in parareal framework. This coupling strategy is studied for efficiently solving oscillat...
Optimized Schwarz methods form a class of domain decomposition al- gorithms in which the transmissio...
In this work we introduce a new two-level preconditioner for the efficient solution of large-scale l...
This thesis presents a set of routines that aim at solving large linear systems on parallel computer...
In this thesis, we first present an interpretation of parareal as a two-level domain decomposition p...
International audienceWe describe an interpretation of parareal as a two-level additive Schwarz prec...
We propose a modified parallel-in-time - Parareal - multi-level time integration method which, in co...
International audienceWe propose a new strategy for solving by the parareal algorithm highly oscilla...
We study in this thesis space-time domain decomposition methods, in particular, the Parareal method,...
International audienceWe propose and analyse a parallel method, both in the time and space direction...
International audienceIn this paper, we consider the problem of accelerating the numerical simulatio...
In this paper, we present an hybrid solver for linear systems that combines a Krylov subspace method...
In this paper, we consider the problem of accelerating the numerical simulation of time dependent pr...
This thesis presents a set of numerical schemes that aim at solving large linear systems on parallel...
Optimized Schwarz methods form a class of domain decomposition al- gorithms in which the transmissio...
In this work we introduce a new two-level preconditioner for the efficient solution of large-scale l...
This thesis presents a set of routines that aim at solving large linear systems on parallel computer...
In this thesis, we first present an interpretation of parareal as a two-level domain decomposition p...
International audienceWe describe an interpretation of parareal as a two-level additive Schwarz prec...
We propose a modified parallel-in-time - Parareal - multi-level time integration method which, in co...
International audienceWe propose a new strategy for solving by the parareal algorithm highly oscilla...
We study in this thesis space-time domain decomposition methods, in particular, the Parareal method,...
International audienceWe propose and analyse a parallel method, both in the time and space direction...
International audienceIn this paper, we consider the problem of accelerating the numerical simulatio...
In this paper, we present an hybrid solver for linear systems that combines a Krylov subspace method...
In this paper, we consider the problem of accelerating the numerical simulation of time dependent pr...
This thesis presents a set of numerical schemes that aim at solving large linear systems on parallel...
Optimized Schwarz methods form a class of domain decomposition al- gorithms in which the transmissio...
In this work we introduce a new two-level preconditioner for the efficient solution of large-scale l...
This thesis presents a set of routines that aim at solving large linear systems on parallel computer...